Small Mersenne Prime Factors (page 4821/5025)

Small Mersenne Prime Factors
Prime numbers of the form M_p= 2^p − 1 are called Mersenne primes. For M_p to be prime, p must also be prime.
Any factor q of a Mersenne number 2^p − 1 must be of the form 2kp + 1, where integer k ≥ 0. Furthermore, q must be 1 or 7 mod 8.

Exponent	Prime Factor	Dig.	Year
103768537511	207537075023	12	~2017
103769941733	622619650399	12	~2018
103774300739	207548601479	12	~2017
103785795131	207571590263	12	~2017
103798757351	207597514703	12	~2017
103799061491	207598122983	12	~2017
103812079883	207624159767	12	~2017
103814192113	622885152679	12	~2018
103817358971	207634717943	12	~2017
103817819641	622906917847	12	~2018
103824267383	207648534767	12	~2017
103825666319	207651332639	12	~2017
103829231003	207658462007	12	~2017
103829987351	207659974703	12	~2017
103838352311	207676704623	12	~2017
103842884963	207685769927	12	~2017
103852048031	207704096063	12	~2017
103853002811	207706005623	12	~2017
103859160731	207718321463	12	~2017
103867922981	1726...994423	15	2023
103869720023	207739440047	12	~2017
103872743833	623236462999	12	~2018
103873381523	207746763047	12	~2017
103880841539	207761683079	12	~2017
103882313651	207764627303	12	~2017

Exponent	Prime Factor	Dig.	Year
103887841331	207775682663	12	~2017
103890096743	207780193487	12	~2017
103892066819	207784133639	12	~2017
103895507713	623373046279	12	~2018
103901919911	207803839823	12	~2017
103913335453	623480012719	12	~2018
103924778183	207849556367	12	~2017
103927101251	207854202503	12	~2017
103930239239	207860478479	12	~2017
103933427891	207866855783	12	~2017
103933949543	207867899087	12	~2017
103941298031	207882596063	12	~2017
103943102663	207886205327	12	~2017
103960406477	623762438863	12	~2018
103964961281	623789767687	12	~2018
103967970563	207935941127	12	~2017
103976659511	207953319023	12	~2017
103977745681	623866474087	12	~2018
103983099611	207966199223	12	~2017
103987970951	207975941903	12	~2017
103990287683	207980575367	12	~2017
103996285199	207992570399	12	~2017
103998404903	207996809807	12	~2017
103999487533	623996925199	12	~2018
104001864493	624011186959	12	~2018

Exponent	Prime Factor	Dig.	Year
104001960299	208003920599	12	~2017
104004761957	624028571743	12	~2018
104008118933	624048713599	12	~2018
104018094977	624108569863	12	~2018
104028935663	208057871327	12	~2017
104041220693	624247324159	12	~2018
104045684279	208091368559	12	~2017
104051418323	208102836647	12	~2017
104054560861	5723...473551	14	2024
104056777871	208113555743	12	~2017
104057273531	208114547063	12	~2017
104065177019	208130354039	12	~2017
104069236961	624415421767	12	~2018
104075862479	208151724959	12	~2017
104076717071	208153434143	12	~2017
104088773231	208177546463	12	~2017
104091613799	208183227599	12	~2017
104098439603	208196879207	12	~2017
104098618583	208197237167	12	~2017
104105050271	208210100543	12	~2017
104107105139	208214210279	12	~2017
104109302711	208218605423	12	~2017
104115030611	208230061223	12	~2017
104116002953	624696017719	12	~2018
104126965823	208253931647	12	~2017

Exponent	Prime Factor	Dig.	Year
104131885043	208263770087	12	~2017
104133141191	208266282383	12	~2017
104134770769	3478...436847	14	2023
104139206617	624835239703	12	~2018
104140145951	208280291903	12	~2017
104152330097	624913980583	12	~2018
104161384081	624968304487	12	~2018
104173755083	208347510167	12	~2017
104178736577	625072419463	12	~2018
104180834819	208361669639	12	~2017
104182986191	208365972383	12	~2017
104207271599	208414543199	12	~2017
104221526173	625329157039	12	~2018
104221997003	208443994007	12	~2017
104236532399	208473064799	12	~2017
104243829553	625462977319	12	~2018
104248995659	208497991319	12	~2017
104263502543	208527005087	12	~2017
104274086363	208548172727	12	~2017
104277382031	208554764063	12	~2017
104283412679	208566825359	12	~2017
104283936563	208567873127	12	~2017
104289953231	208579906463	12	~2017
104294962283	208589924567	12	~2017
104314877363	208629754727	12	~2017

4.724.182 digits

25-04-13